Perturbative Coulomb branches on $\mathbb{R}^3\times S^1$: the global D-term potential

TL;DR

This paper derives a perturbative potential for 3d $ ext{N}=2$ Coulomb branches from 4d $ ext{N}=1$ theories on $R^3 imes S^1$, providing a global view crucial for understanding SUSY vacua and moduli space structure.

Contribution

It introduces a formula for the perturbative Coulomb branch potential in circle-compactified SUSY gauge theories, filling a gap in the literature and enabling systematic analysis.

Findings

Provides a global formula for the Coulomb branch potential

Identifies SUSY vacua via the zero locus of the potential

Connects the potential to the Cardy limit of the superconformal index

Abstract

We find the perturbative potential on the 3d $\mathcal{N}\!=\!2$ Coulomb branch arising from a chiral 4d $\mathcal{N}\!=\!1$ gauge theory on $\mathbb{R}^3 \times S^1$, zeta-regularizing the D-term couplings generated by the Kaluza-Klein modes. This fills a significant gap in the literature on circle-compactified SUSY gauge theories. Unlike earlier indirect approaches to the circle reduction of chiral theories, our formula provides a global view of the Coulomb branch, necessary for capturing holonomy saddles and for systematic implementation. The zero locus of the potential identifies perturbative SUSY vacua, and we show how data-analysis techniques (such as RANSAC hyperplane detection) numerically extract the structure of the moduli space when this locus is extended. Our formula yields new results even in abelian theories, and offers a new perspective on several earlier observations in the context of the Cardy limit of the superconformal index. In particular, circle reductions (of interest in the SCFT/VOA correspondence) found earlier from limits of the index can now be reproduced on $\mathbb{R}^3 \times S^1$. An appendix shows how our 3d $\mathcal{N}\!=\!2$ potential is related to a function arising in the Cardy limit of the index analogously to how the 4d $\mathcal{N}\!=\!2$ prepotential arises in a limit of the Nekrasov partition function.